Representation theory in complex rank, I

Abstract

P. Deligne defined interpolations of the tensor category of representations of the symmetric group Sn to complex values of n. Namely, he defined tensor categories Rep(St) for any complex t. This construction was generalized by F. Knop to the case of wreath products of Sn with a finite group. Generalizing these results, we propose a method of interpolating representations categories of various algebras containing Sn (such as degenerate affine Hecke algebras, symplectic reflection algebras, rational Cherednik algebras, etc.) to complex values of n. We also define the group algebra of Sn for complex n, study its properties, and propose a Schur-Weyl duality for Rep(St). In version 2, same more details have been added.